# Return Nearest Place available to Users location using Latitude-Longitude?

I want to implement Nearest Place available to User algorithm in Java or MySQL.

I have Stations table in MySQL database which has around 100K records of Stations with Latitude and Longitude. If User gives his latitude and longitude as x and y, then I want to return nearest stations available from User's location.

So please suggest me any algorithm available in Java or MySQL.

I tried with the following query, but it seems slower in performance -

SELECT *,3956*2*ASIN(SQRT(POWER(SIN((user_lat-abs(st.station_lat))*pi()/180/2 ), 2) + COS(user_lat*pi()/180)*COS(abs(st.station_lat) *pi()/180)*POWER(SIN((user_lon-
st.station_lon)*pi()/180/2 ),2))) AS distance FROM Stations st HAVING distance < 10 ORDER BY distance;


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Possible duplicate: stackoverflow.com/questions/1006654/… –  Udo Klimaschewski Nov 21 '12 at 12:54
Maybe you should put the algorithm in the question so that people can try to modify it for a better performance- P.S The Algorithm not the implementation –  Ishan Khanna Nov 21 '12 at 12:57
Thanks @Udo Klimaschewski, it was helpful. –  Deepu Nov 22 '12 at 6:47
I suggest using the 'equirectangular projection' rather than the 'law of cosines' for distance. –  TreyA Nov 22 '12 at 10:17

I use the Haversine formula in the following PHP PDO query. It pulls data from a table with 2.7K records and displays them on a MAP in less than 1 second with geocoding.. It defaults cleanly if searching outside range of database(Paris 25 miles).

Use 6357 in formula if kilometers are required instead of miles.

$stmt =$dbh->prepare("SELECT  name, lat, lng, ( 3959 * acos( cos( radians(?) ) * cos( radians( lat ) ) * cos( radians( lng ) - radians(?) ) + sin( radians(?) ) * sin( radians( lat ) ) ) ) AS distance FROM gbstn HAVING distance < ? ORDER BY distance LIMIT 0 , 20");
// Assign parameters
$stmt->bindParam(1,$center_lat);
$stmt->bindParam(2,$center_lng);
$stmt->bindParam(3,$center_lat);
$stmt->bindParam(4,$radius);

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Great If it works ! –  Ishan Khanna Nov 21 '12 at 12:57